Cecil,Thomas E. <br/><br/>
lie sphere geometry: with applications to submanifolds/ 
Thomas E.Cecil 
 - New York:  Springer-Verlag,  1992. 
 - 207p. 
<br/><br/><br/>Chapter 1 — Lie Sphere Geometry 8<br/>1.1 Preliminaries ®<br/>1.2 Moebius Geometry of Unoriented Spheres 11<br/>1.3 Lie Geometry of Oriented Spheres 15<br/>1.4 Geometry of Hyperspheres in S and// 19<br/>1.5 Oriented Contact and Parabolic Pencils of Spheres 22<br/>Chapter 2 - Lie Sphere Transformations 29<br/>2.1 The Fundamental Theorem 29<br/>2.2 Generation of the Lie Sphere Group by Inversions 36<br/>2.3 Geometric Description of Inversions 42<br/>2.4 Laguerre Geometry 47<br/>2.5 Sub Geometries of Lie Sphere Geometry 59<br/>Chapters - Legendre Submanifolds 65<br/>3.1 Contact Structure 65<br/>3.2 Definition of Legendre Submanifolds 73<br/>3.3 The Legendre Map 7,8<br/>3.4 Curvature Spheres and Parallel Submanifolds 84<br/>3.5 Lie Curvatures of Legendre Submanifolds 95<br/>xii Contents<br/>3.6 Taut Submanifolds 108<br/>3.7 Compact Proper Dupin Submanifolds 113"<br/>Chapter 4 — Dupin Submanifolds 129<br/>4.1 Local Constructions 129<br/>4.2 Reducible Dupin Submanifolds 130<br/>4.3 Cyclides of Dupin 150<br/>4.4 Principal Lie Frames 159<br/>4.5 Half-Invariant Differentiation 166<br/>4.6 Dupin Hypersurfaces in 4-Space 171<br/> 
<br/><br/><label>ISBN: </label>3540977473 
<br/><br/><label>Dewey Class. No.: </label>516.36  / CEC/L